@

## QOOTNPQS@13:30--15:40

uҋyё
u
13:30?14:30
uҁF쎛 h (k )
ځFV[fBK[ʑ̏l

u
14:40?15:40
uҁFX c (k )
ځF A Fourier restriction theorem and real-principal-type pseudodifferential operators

## QOOTNPQO@14:30--17:50

uҋyё
u
14:30?15:30
uҁF a (k )
ځFԔl Fisher ^ɂtg̓d

u
15:40?16:40
uҁF T (k , )
ځFgʑ̏l̉𐫂ɂ

Ou
16:50?17:50
uҁFrc K (k )
ځFGierer--Meinhardt ̃XgCvp^[̕s萫

## QOOTNPPR@14:30--17:50

uҋyё
u
14:30?15:30
uҁF쓇 Dj (k )
ځF܂ފC̒CɊւ鋫Elِ̓ۓ

u
15:40?16:40
uҁFߐ q (k )
ځFSturm-Liouville Diracpf̋tŗLl̈Ӑ

Ou
16:50?17:50
uҁFv [ (k )
ځF񎩌ȋ Dirac ^pf̃XyNgɂ

## QOOSNPQX@16:00--17:30

u
_j (؍XÍ)
SU(3)˓cn݂̉̑ɂ
v|
Q[W_ȂǂɌSU(3)˓cn݂̉̑Ɋւ錋ʂ Љ.̕ńAXJ[Liouvilleiw^ ȉ~j̈̃VXełƂ.uł́Aؖ Kvłϕ\Ɋւ鎖"RpNgłȂ"̗̋Ɍ̉ iblow-up analysis)ɂāAXJ[̏ꍇł͌ȂۂȂǂɒ ӂȂ. ȂЉ錋ʂ́Aϊّ(؍)D.ChaeƍbH̗؋M Ƃ̋ɂ̂ł.

## QOOSNPPQT@16:00--17:30

u
|{ Tq (c H)
On a local energy decay of solutions for the equation of motion of compressible viscous fluid in an exterior domain
v|
kS̒̍̂̉^́C̏ɌŒW Ƃ邱ƂɂCNavier-Stokes ̊O ƂĒ莮DkŜ̐߂̈悪 LËCSԂ܂͊Ö̎ɂ1980N Stor\"ohmer, Matsumura-Nishida ɂ菉l 炩ŏꍇɖ{uň̎ԑI Ӊ݂̑ $L_2$ gŎĂD X̍ŏIڕW $n$ $(n \le 2)$ Ö ł̉̑Qߋ߂邱Ƃł邪C{uł ̂߂̑iKƂĕKvƂȂ ̋ǏxɊւ錋ʂqׁED

## QOOSNPPPP@16:00--17:30

u
$L^p$-Theory of the Navier-Stokes Flow in the Exterior of a Rotating Obstacle
v|
We consider the equations of Navier-Stokes in the exterior of a rotating domain. It is shown, that after rewriting the problem on a fixed domain $\Omega$, the solution of the corresponding Stokes equation is governed by a $C_0$-semigroup on $L^p_\sigma(\Omega)$, $1pinfty$. Moreover, for $p\geq n$ and initial data $u_0\in L^p_\sigma(\Omega)$, we prove the existence of a unique local mild solution to the Navier-Stokes problem.

## QOOSNPPS@16:00--17:30

u
Hermann Sohr (University of Paderborn) 21ICOEvO^
Some recent results on the Navier-Stokes equations
v|
The aim of this talk is to explain some new results in particular on local regularity properties of Hopf type weak solutions to the Navier-Stokes equations for arbitrary domains. Further we explain a new existence result for nonhomogeneous data and a result for global regular solutions with "slightly" modified forces.

## QOOSNPOQW@13:30--15:00

u
ikEECOEtF[j
ՊESobolevw܂ޑȉ~^̍ŏGlM[ _ɂ
v|
ׂ^̑ȉ~^̍ŏGlM[l@܂D ׂ̎wՊESobolevŵƂɂ́CSobolev ߍ݂̃RpNg @̂߂ɕϕ@̒ږ@ɂĂ͍ŏ邱Ƃ͂łȂC K̐ۓ邱ƂōŏGlM[݂̑邱ƂC Brezis-NirenbergB̌ȍ~悭mĂ܂Dۓ[ɋ߂ÂƉ f^֐ɔC̔_͗̈Green֐̐iRobin֐j ՊE_ɂȂ邱ƂmłD̍uł́Cʂɔ_Robin֐ ŏ_ɂȂEƂC]TΗގ̖ɂ̔_Ɋւ Rey, Brezis̗\z̏ؖɂĂqׂ܂D

## QOOSNPOQP@16:00--17:30

u
v pv ( )
^gn̑̑Qߋɂ
v|
{uł́A^gnɑ΂鏉l̑ Qߋɒڂ.܂Ȃ݂ɂĂ͐Ďg ۓƂ݂Ȃŉł.Ƃ낪A̖ɂ܂Ŕ^̉ecA ͂Ďg̉(R)ǂߎł͂ȂȂĂ܂悤 ^݂̉邱Ƃ񍐂.̂悤ȉ̋𑨂邽߂ɁA ŗǂߎ^悤Ȋ֐Ďg̉Ƃč\A ƂȂĂ̋̃GlM[EmUĂ܂悤Ȃ̂Ƃ Â邱Ƃł.A{͋vۓcKƍGƂ̋ ̂ł.

## QOOSNPOPS@16:00--17:30

u
ɓ v (ߑ H)
Stability of solutions to steady state system of one-dimensional phase field models Penrose-Fife type
v|
This is a joint work with Prof. T. Suzuki (Osaka Univ.). Weconsider one-dimensional phase field models of Penrose-Fife type. In this talk, first of all we will show the global existence and uniqueness resultsof solutions to our system, which is the extension of the results obtainedby S. Zheng. Moreover, we investigate the stability of steady state solutions associated with our PDEs' system. Actually, we show it by usingthe fact that semi-minimality and semi-unfolding property are satisfied inour model.

## QOOSNPOV@16:00--17:30

u
(k )
Global solutions for quasilinear wave equations with the null condition in exterior domains
v|
gn̊Oɂču܂. Null condition ɉ肵Af[^ɑ΂鎞ԑ\܂. OƂĂ̏Q͋E炩ŃRpNgȕŁAǏGlM[ 悤Ȃ̂l@܂. uł́AOł̃GlM[@̍\@Cɘb܂.

## QOOSNVPT@16:00-17:30

u
^ (k )
͂ޖʐςȕʓ̒eȐ̉^
v|
ʓɒêłłȐAꂪ͂ޓ̈Ƃ̊O ̔񈳏kŜłꂼꖞĂƂ. 񈳏k̉ɂÄ̖ʐς͈ƂȂ邽߁A ̂悤ȕȐ̉^͔Lk͂ޖʐψƂ̑ ]Ȑ̒eGlM[(ȗ̕ϕ)ɑ΂zɎxz. {uł́AɁǍz̎ԑ݂̑ɂďqׂ.

## QOOSNVW@16:00--17:30

u
{ s ( bH)
The Gel'fand problem with non-local term
v|
Ǐȉ~^グ.̖͗Ⴆ Keller-Segel f̒Ԃƍl邱Ƃo邪A ̉̑݁E񑶍݂͂߂Ƃ萫Iグ. ɗ̈悪n̋ʂ̎͏ڂvZoA ɂď󋵂傫ς邱Ƃ Morse index ̌ʂЉ.

## QOOSNVP@16:00--17:30

u
BK iB j
ًɌpړE̋ߎƂ̐lvZ
v|
{uł́AړEƂāAXet@ E}̗Lq porous medium グ. ̖ɌړE𐔒lIɑ邱ƂړIƂA 锽gUnً̓ɌpړE̋ߎl@. Xet@ɂāAߎ̗_IȗtƂƂɁA lvZɓKpꍇ̒qׂ. l̎@ porous medium ɓKpAlI ʂ.{úABww@w{GƂ ɂ̂ł.

## QOOESNUPV@13:15--14:45

u
jF (k )
|A\f̃XyNgɂ
v|
|A\^_|eVi|A\zuȂq̍ |eVjV[fBK[pflA ̖{Iȋ𐫁A yъmPł̃XyNgW̓ɂĂ̌ʂЉ. {Iȋ𐫂́A{EJe̒藝pĊmPɂ |eV̉̐U]邱ƂɂAؖ. XyNgW̓́Aadmissible potential̗_(Kirsch-Martinelli) \AŗLlžʂp邱Ƃɂs.

## QOOSNUR@16:00--17:30

u
썎 (k )
ϋȗɑ΂B-M-O ASYɂ
v|
ϋȗ̋ߎl̓ASY łABence-Merriman-Osher (B-M-O) ASY M̉pĊȒPȃvZXɂĕϋȗČ. ̃ASYグA̎ɂāA ]mĂ锼Qɑ΂p Ginzburg-Landau ِ̓ۓɑ@pāA S̕@킹ėp邱Ƃɂ蒼ړIɏؖ邱Ƃ݂. ɋɑΉߎ𓱓āA ꂪ^̋Ɏ邱Ƃ.

## QOOSNTQV@16:00--17:30

u
Vc L (c H)
On local solvability of the Navier-Stokes flow with linearly growing initial data
v|
In this talk we consider the nonstationaryincompressible Naveir-Stokes equations in the whole space $R^n$ with the initialvelocity characterized by $Mx + u_0(x)$. Here $M$ is a constant matrix, and $u_0$ is a function. In this situation we construct the uniquelocal mild solution in $L^p_\sigma(R^n)$ for $p \in [n,\infty]$. Our main tool is the Ornstein-Uhlenbecksemigroup. Under some assumption, we also show that the mild solution is analytic in $x$,although the semigroup is not analytic.

## QOOSNTQO@16:00--17:30

u
LF (򕌑 )
qXeVX𔺂PLɂ
v|
Lɂ鉞͂Ƙc݂̊֌ẂCqXeVXpf̂ċLq. ̊֌Wstopoperatorŕ\f𓱏o. ܂Cߋ̌ʂɂẮC͂ɊւS傫ƂƂɉ肳Ă. ̉͌ۂƈvȂ. ŁC̍uł́CSꍇ̃f̓KؐɂēɏڂЉ. ̌ƂȂ̂́CfGinzburg-Landaůj ɑ΂Maximal regularity ł. ȂC̐ʂ͍LCwEpJ֎C kwEg񎁂Ƃ̋ɂ̂ł.

## QOOSNTPR@16:00--17:30

u
Jann-Long Chern (National Central University, Taiwan)
Limit behaviors and structure between regular and singular radial solutions for some semilinear elliptic equations
v|
We will investigate limit behaviors between regular and singular radial solutions for some semilinear elliptic equations. Using these asymptotic behaviors we can clarify entire structure of the set of solutions of various types.

## QOOSNSQQ@16:00--17:30

u
R Rb (Ócm)
Global existence and decay property of weak solutions @ for some degenerate quasilinear parabolic systems @ modeling chemotaxis
v|
܂Chemotaxis system ɂđ̌ʂ邪A̎v މ^ʂ͂܂񍐂ĂȂ. ł͑މ^Chemotaxis system݂̎̑Ǝ̑Qߋ ēꂽʂ񍐂.

## QOOSNSPT@16:00--17:30

u
s ( , k )
Benjamin-Ono ̏l̓Kؐ
v|
Benjamin-Ono ͒ꂪ[ʔgLq郂fƂČA󐅔gł Korteweg de-Vries ƕőĂ.Benjamin-Ono l Sobolev Ԃōl. Korteweg de-Vries ɔׂ̐̎ (Kato's Smoothing effect)アAHilbert ϊ܂܂ĂȂ lɂđ̖_邪uł͖_ ̍@𒆐Sɐ.